In solid geometry, a face is a flat (planar) surface that forms part of the boundary of a solid object;^{[1]} a three-dimensional solid bounded exclusively by flat faces is a polyhedron.
In more technical treatments of the geometry of polyhedra and higher-dimensional polytopes, the term is also used to mean an element of any dimension of a more general polytope (in any number of dimensions).^{[2]}
In elementary geometry, a face is a polygon on the boundary of a polyhedron.^{[2]}^{[3]} Other names for a polygonal face include side of a polyhedron, and tile of a Euclidean plane tessellation.
For example, any of the six squares that bound a cube is a face of the cube. Sometimes "face" is also used to refer to the 2-dimensional features of a 4-polytope. With this meaning, the 4-dimensional tesseract has 24 square faces, each sharing two of 8 cubic cells.
Polyhedron | Star polyhedron | Euclidean tiling | Hyperbolic tiling | 4-polytope |
---|---|---|---|---|
{4,3} | {5/2,5} | {4,4} | {4,5} | {4,3,3} |
The cube has 3 square faces per vertex. |
The small stellated dodecahedron has 5 pentagrammic faces per vertex. |
The square tiling in the Euclidean plane has 4 square faces per vertex. |
The order-5 square tiling has 5 square faces per vertex. |
The tesseract has 3 square faces per edge. |
Some other polygons, which are not faces, are also important for polyhedra and tessellations. These include Petrie polygons, vertex figures and facets (flat polygons formed by coplanar vertices which do not lie in the same face of the polyhedron).
Any convex polyhedron's surface has Euler characteristic
where V is the number of vertices, E is the number of edges, and F is the number of faces. This equation is known as Euler's polyhedron formula. Thus the number of faces is 2 more than the excess of the number of edges over the number of vertices. For example, a cube has 12 edges and 8 vertices, and hence 6 faces.
In higher-dimensional geometry the faces of a polytope are features of all dimensions.^{[2]}^{[4]}^{[5]} A face of dimension k is called a k-face. For example, the polygonal faces of an ordinary polyhedron are 2-faces. In set theory, the set of faces of a polytope includes the polytope itself and the empty set where the empty set is for consistency given a "dimension" of −1. For any n-polytope (n-dimensional polytope), −1 ≤ k ≤ n.
For example, with this meaning, the faces of a cube include the empty set, its vertices (0-faces), edges (1-faces) and squares (2-faces), and the cube itself (3-face).
All of the following are the faces of a 4-dimensional polytope:
In some areas of mathematics, such as polyhedral combinatorics, a polytope is by definition convex. Formally, a face of a polytope P is the intersection of P with any closed halfspace whose boundary is disjoint from the interior of P.^{[6]} From this definition it follows that the set of faces of a polytope includes the polytope itself and the empty set.^{[4]}^{[5]}
In other areas of mathematics, such as the theories of abstract polytopes and star polytopes, the requirement for convexity is relaxed. Abstract theory still requires that the set of faces include the polytope itself and the empty set.
A cell is a polyhedral element (3-face) of a 4-dimensional polytope or 3-dimensional tessellation, or higher. Cells are facets for 4-polytopes and 3-honeycombs.
Examples:
4-polytopes | 3-honeycombs | ||
---|---|---|---|
{4,3,3} | {5,3,3} | {4,3,4} | {5,3,4} |
The tesseract has 3 cubic cells (3-faces) per edge. |
The 120-cell has 3 dodecahedral cells (3-faces) per edge. |
The cubic honeycomb fills Euclidean 3-space with cubes, with 4 cells (3-faces) per edge. |
The order-4 dodecahedral honeycomb fills 3-dimensional hyperbolic space with dodecahedra, 4 cells (3-faces) per edge. |
In higher-dimensional geometry, the facets (also called a hyperface^{[7]}) of a n-polytope are the (n-1)-faces of dimension one less than the polytope itself.^{[8]} A polytope is bounded by its facets.
For example:
In related terminology, a (n − 2)-face of an n-polytope is called a ridge (also subfacet).^{[9]} A ridge is seen as the boundary between exactly two facets of a polytope or honeycomb.
For example:
A (n − 3)-face of an n-polytope is called a peak. A peak contain a rotational axis of facets and ridges in a regular polytope or honeycomb.
For example: